\hypertarget{_trianglar_element_8f90}{
\section{/home/ronaldo/workspace/\-Discontinuous\-Galerkin/\-Trianglar\-Element.f90 \-File \-Reference}
\label{_trianglar_element_8f90}\index{/home/ronaldo/workspace/\-Discontinuous\-Galerkin/\-Trianglar\-Element.\-f90@{/home/ronaldo/workspace/\-Discontinuous\-Galerkin/\-Trianglar\-Element.\-f90}}
}
\subsection*{\-Data \-Types}
\begin{DoxyCompactItemize}
\item 
module \hyperlink{class_triangle_element_manipulation}{\-Triangle\-Element\-Manipulation}
\item 
type \hyperlink{struct_triangle_element_manipulation_1_1_triangle_element}{\-Triangle\-Element\-Manipulation\-::\-Triangle\-Element}
\begin{DoxyCompactList}\small\item\em \-Triangular \-Element  \-The element is not aware of its \-Neighbours. \-Is up to the grid decide which is neighbour of which \-The \-Solution of the \-Discontinuous \-Finite \-Element formulation is by \-Sucessive \-Substitution, which is equivalent to iteratively solve a block-\/diagonal global matrix. \-This kind of solution is well-\/suited to parallel environments with fast interprocess communication systems. \-Due to this choice of solution procedures the local values of the \-Degrees of \-Freedom must be separated into two categories, the trying value and the committed value. \end{DoxyCompactList}\end{DoxyCompactItemize}
